- #1
emob2p
- 56
- 1
Hi,
I'm trying to prove that b^{r+s}=b^r*b^s for any real r,s where b^r = sup{b^t:t \leq r} and t is rational. (This is prob 1.6f in Rudin)
My question. Can one show that for two sets X and Y:
sup(XY)=(supX)(supY) where XY = {x*y: x\in X, y\in Y}
Thanks,
E
I'm trying to prove that b^{r+s}=b^r*b^s for any real r,s where b^r = sup{b^t:t \leq r} and t is rational. (This is prob 1.6f in Rudin)
My question. Can one show that for two sets X and Y:
sup(XY)=(supX)(supY) where XY = {x*y: x\in X, y\in Y}
Thanks,
E
